Here is my Top 5 F1 Games from the last 15 years or so Be sure to leave your opinions in the comments down below At number 4 I said 2012 when I meant. Formula 1 2002 Pc Game Download' title='Formula 1 2002 Pc Game Download' />2002 Formula 370SS Beautiful 2002 Formula 370SS 97,500 Length37 EngineTwin Mercruiser 496 HO ColorWhite with Red accent Sleeps 4 comfortably, TV, Microwave. Distance. This uses the haversine formula to calculate the greatcircle distance between two points that is, the shortest distance over the earths. Optic Nerve Formula is a specialized nutritional formulation to protect the optic nerve with a blend of omega fatty acids, antioxidants and other key nutrients. F1%202002%20%28SLUS-20455%29%203.jpg' alt='Formula 1 2002 Pc Game Download Full Version' title='Formula 1 2002 Pc Game Download Full Version' />Calculate distance and bearing between two LatitudeLongitude points using haversine formula in Java. Script. This page presents a variety of calculations for latitudelongitude points, with the formul and. All these formul are for calculations on the basis of a spherical earth ignoring ellipsoidal. In fact, the earth is very slightly ellipsoidal using a spherical model gives. Hp Deskjet 930C Driver For Windows 7. Distance. This uses the haversine formula to calculate the great circle distance between two. Haversineformula a sin2 cos 1 cos 2 sin2c 2 atan. R cwhere is latitude, is longitude, R is earths radius mean radius 6,3. Java. Script. R 6. Radians. var 2 lat. Radians. var lat. Radians. var lon. Radians. var a Math. Math. sin2. Math. Math. Math. sin2 Math. Math. atan. 2Math. Math. sqrt1 a. R c Note in these scripts, I generally use latlon for latitudelongitude in degrees, and for. Historical aside. The height of technology for navigators calculations used to be log tables. As there is no. real log of a negative number, the versine enabled them to keep trig functions in. Also, the sin2 form of the haversine avoided addition which entailed. Printed tables for the. The haversine. formula. The reversed sine is 1cos, and the. Once widely used by navigators, it was described by Roger Sinnott in. Sky Telescope. Virtues of the Haversine Sinnott explained that the angular separation. Mizar and Alcor in Ursa Major 01. TRS 8. 0 using the haversine. For the curious, c is the angular distance in radians, and a is the square of half. If atan. 2 is not available, c could be calculated. Using Chrome on a middling Core i. PC, a distance calculation takes around. Little to no benefit is obtained by factoring out common terms probably the JIT compiler. Spherical Law of Cosines. In fact, Java. Script and most modern computers languages use IEEE 7. By my estimate, with this precision. C. gives well conditioned results down to distances as small as a few metres on the earths surface. Note that the geodetic form of the law of cosines is rearranged from the. This makes the simpler law of cosines a reasonable 1 line alternative to the haversine formula for. The choice may be driven by programming language, processor. Law of cosines d acos sin 1 sin 2 cos 1 cos 2 cos RJava. Script. var 1 lat. Radians, 2 lat. Radians, lon. Radians, R 6. Math. Math. Math. sin2 Math. Math. cos2 Math. R Excel ACOS SINlat. SINlat. 2 COSlat. COSlat. 2OSlon. ACOS SINlat. I1. SINlat. 2I1. COSlat. I1. COSlat. 2I1. COSlon. I1. PI1. 80 6. While simpler, the law of cosines is slightly slower than the haversine, in my tests. Equirectangular approximation. If performance is an issue and accuracy less important, for small distances. Pythagoras. theorem can be used on an equirectangular. Formulax cos my d R x yJava. Script. var x 2 1 Math. Math. sqrtx y R This uses just one trig and one sqrt function as against half a dozen trig functions for cos. Accuracy is somewhat complex along meridians there. Alternatively, the polar coordinate flat earth formula can be used. R 1 2 2 1 2 cos. Ive not compared accuracy. Baghdad to Osaka not a constant bearing Bearing. In general, your current heading will vary as you follow a great circle path orthodrome the. N,4. 5E  Baghdad to 3. N,1. 35E  Osaka, you. This formula is for the initial bearing sometimes referred to as forward azimuth which if. Formula atan. Java. Script all angles in radians. Math. sin2 1 Math. Math. cos1ath. Math. Math. cos2 1. Math. Degrees Excel all angles in radiansATAN2COSlat. SINlat. 2 SINlat. COSlat. 2OSlon. SINlon. OSlat. Excel reverses the arguments to ATAN2 see notes below. Since atan. 2 returns values in the range. For final bearing, simply take the initial bearing from the end point. Midpoint. This is the half way point along a great circle path between the two. Formula Bx cos 2 cos By cos 2 sin m atan. Bx By m 1 atan. By, cos1BxJava. Script all angles in radians. Bx Math. cos2 Math. By Math. cos2 Math. Math. atan. 2Math. Math. sin2. Math. Math. cos1BxMath. Bx Byy. var 3 1 Math. By, Math. cos1 Bx The longitude can be normalised to 1. Just as the initial bearing may vary from the final bearing, the midpoint may. N,4. 5E. and 3. 5N,1. E is around 4. 5N,9. E. An intermediate point at any fraction along the great circle path between two points can also be. Formula a sin1f sin b sinf sin x a cos 1 cos 1 b cos 2 cos 2y a cos 1 sin 1 b cos 2 sin 2z a sin 1 b sin 2i atan. R between the two points. Destination point given distance and bearing from start point. Given a start point, initial bearing, and distance, this will calculate the destination point and. Formula 2 asin sin 1 cos cos 1 sin cos 2 1 atan. R d being the distance travelled, R the earths radius. Java. Script all angles in radians. Math. asin Math. Math. R. Math. cos1ath. Rath. cosbrng. Math. Math. Math. sindRath. Math. cosdR Math. Math. sin2 The longitude can be normalised to 1. Excel all angles in radianslat. ASINSINlat. 1OSdR COSlat. SINdROSbrnglon. ATAN2COSdR SINlat. SINlat. 2, SINbrngINdROSlat. Remember that Excel reverses the arguments to ATAN2 see notes below. For final bearing, simply take the initial bearing from the end point to the start. Intersection of two paths given start points and bearings. This is a rather more complex calculation than most others on this page, but Ive been asked for it a number of times. This comes from Ed Williams aviation formulary. See below for the Java. Script. Formula 1. This is a lot simpler using vectors rather than spherical trigonometry. Cross track distance. Heres a new one Ive sometimes been asked about distance of a point from a great circle path. Formula dxt asin sin1. Rwhere. 1. 3 is angular distance from start point to third point1. R is the earths radius. Java. Script var d. Xt Math. asinMath. Rath. sin1. 3 1. R Here, the great circle path is identified by a start point and an end point depending on what initial data youre working from. The sign of dxt tells you which side of the path the third point is on. The along track distance, from the start point to the closest point on the path to the third point, is. Formula dat acos cos1. Rwhere. 1. 3 is angular distance from start point to third pointxt is angular cross track distance. 7.3L Injector Driver Module. R is the earths radius. Java. Script var d. At Math. acosMath. RMath. cosd. XtR R Closest point to the poles. And Clairauts formula will give you the maximum latitude of a great circle path. Formula max acos sin cos Java. Script var Max Math. Math. absMath. sinath. Rhumb lines. A rhumb line or loxodrome is a path of constant bearing, which crosses all meridians at the. Sailors used to and sometimes still navigate along rhumb lines since it is easier to follow.